Consider two curves E, P as `E : x^2/9+y^2/8=1 and P : y^2=4x` on the basis of above answer the following Let m be the slope of a line which is tangent to both E & P then

If m is the slope of the tangent to the curve e^(y)=1+x^(2) , then

If m be the slope of the tangent to the curve e^(2y) = 1+4x^(2) , then

Consider the ellipses E_1:x^2/9+y^2/5=1 and E_2: x^2/5+y^2/9=1 . Both the ellipses have

Consider the curve y=e^(2x) What is the slope of the tangent to the curve at (0,1)

Let C : x^(2) + y^(2) = 9, E : (x^(2))/(9) + (x^(2))/(4) =1 and L : y = 2x be three curves P be a point on C and PL be the perpendicular to the major axis of ellipse E. PL cuts the ellipse at point M. If equation of normal to C at point P be L : y = 2x then the equation of the tangent at M to the ellipse E is

Let C : x^(2) + y^(2) = 9, E : (x^(2))/(9) + (x^(2))/(4) =1 and L : y = 2x be three curves P be a point on C and PL be the perpendicular to the major axis of ellipse E. PL cuts the ellipse at point M. (ML)/(PL) is equal to

Let L be a common tangent line to the curves 4x^2+9y^2=36 and (2x)^2+(2y)^2=31 . Then the square of the slope of the line L is "________"